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Quasi-arithmetic mean

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(Redirected from Generalized f-mean) Generalization of means

In mathematics and statistics, the quasi-arithmetic mean or generalised f-mean or Kolmogorov-Nagumo-de Finetti mean is one generalisation of the more familiar means such as the arithmetic mean and the geometric mean, using a function f {\displaystyle f} . It is also called Kolmogorov mean after Soviet mathematician Andrey Kolmogorov. It is a broader generalization than the regular generalized mean.

Definition

If f is a function which maps an interval I {\displaystyle I} of the real line to the real numbers, and is both continuous and injective, the f-mean of n {\displaystyle n} numbers x 1 , , x n I {\displaystyle x_{1},\dots ,x_{n}\in I} is defined as M f ( x 1 , , x n ) = f 1 ( f ( x 1 ) + + f ( x n ) n ) {\displaystyle M_{f}(x_{1},\dots ,x_{n})=f^{-1}\left({\frac {f(x_{1})+\cdots +f(x_{n})}{n}}\right)} , which can also be written

M f ( x ) = f 1 ( 1 n k = 1 n f ( x k ) ) {\displaystyle M_{f}({\vec {x}})=f^{-1}\left({\frac {1}{n}}\sum _{k=1}^{n}f(x_{k})\right)}

We require f to be injective in order for the inverse function f 1 {\displaystyle f^{-1}} to exist. Since f {\displaystyle f} is defined over an interval, f ( x 1 ) + + f ( x n ) n {\displaystyle {\frac {f(x_{1})+\cdots +f(x_{n})}{n}}} lies within the domain of f 1 {\displaystyle f^{-1}} .

Since f is injective and continuous, it follows that f is a strictly monotonic function, and therefore that the f-mean is neither larger than the largest number of the tuple x {\displaystyle x} nor smaller than the smallest number in x {\displaystyle x} .

Examples

  • If I = R {\displaystyle I=\mathbb {R} } , the real line, and f ( x ) = x {\displaystyle f(x)=x} , (or indeed any linear function x a x + b {\displaystyle x\mapsto a\cdot x+b} , a {\displaystyle a} not equal to 0) then the f-mean corresponds to the arithmetic mean.
  • If I = R + {\displaystyle I=\mathbb {R} ^{+}} , the positive real numbers and f ( x ) = log ( x ) {\displaystyle f(x)=\log(x)} , then the f-mean corresponds to the geometric mean. According to the f-mean properties, the result does not depend on the base of the logarithm as long as it is positive and not 1.
  • If I = R + {\displaystyle I=\mathbb {R} ^{+}} and f ( x ) = 1 x {\displaystyle f(x)={\frac {1}{x}}} , then the f-mean corresponds to the harmonic mean.
  • If I = R + {\displaystyle I=\mathbb {R} ^{+}} and f ( x ) = x p {\displaystyle f(x)=x^{p}} , then the f-mean corresponds to the power mean with exponent p {\displaystyle p} .
  • If I = R {\displaystyle I=\mathbb {R} } and f ( x ) = exp ( x ) {\displaystyle f(x)=\exp(x)} , then the f-mean is the mean in the log semiring, which is a constant shifted version of the LogSumExp (LSE) function (which is the logarithmic sum), M f ( x 1 , , x n ) = L S E ( x 1 , , x n ) log ( n ) {\displaystyle M_{f}(x_{1},\dots ,x_{n})=\mathrm {LSE} (x_{1},\dots ,x_{n})-\log(n)} . The log ( n ) {\displaystyle -\log(n)} corresponds to dividing by n, since logarithmic division is linear subtraction. The LogSumExp function is a smooth maximum: a smooth approximation to the maximum function.

Properties

The following properties hold for M f {\displaystyle M_{f}} for any single function f {\displaystyle f} :

Symmetry: The value of M f {\displaystyle M_{f}} is unchanged if its arguments are permuted.

Idempotency: for all x, M f ( x , , x ) = x {\displaystyle M_{f}(x,\dots ,x)=x} .

Monotonicity: M f {\displaystyle M_{f}} is monotonic in each of its arguments (since f {\displaystyle f} is monotonic).

Continuity: M f {\displaystyle M_{f}} is continuous in each of its arguments (since f {\displaystyle f} is continuous).

Replacement: Subsets of elements can be averaged a priori, without altering the mean, given that the multiplicity of elements is maintained. With m = M f ( x 1 , , x k ) {\displaystyle m=M_{f}(x_{1},\dots ,x_{k})} it holds:

M f ( x 1 , , x k , x k + 1 , , x n ) = M f ( m , , m k  times , x k + 1 , , x n ) {\displaystyle M_{f}(x_{1},\dots ,x_{k},x_{k+1},\dots ,x_{n})=M_{f}(\underbrace {m,\dots ,m} _{k{\text{ times}}},x_{k+1},\dots ,x_{n})}

Partitioning: The computation of the mean can be split into computations of equal sized sub-blocks: M f ( x 1 , , x n k ) = M f ( M f ( x 1 , , x k ) , M f ( x k + 1 , , x 2 k ) , , M f ( x ( n 1 ) k + 1 , , x n k ) ) {\displaystyle M_{f}(x_{1},\dots ,x_{n\cdot k})=M_{f}(M_{f}(x_{1},\dots ,x_{k}),M_{f}(x_{k+1},\dots ,x_{2\cdot k}),\dots ,M_{f}(x_{(n-1)\cdot k+1},\dots ,x_{n\cdot k}))}

Self-distributivity: For any quasi-arithmetic mean M {\displaystyle M} of two variables: M ( x , M ( y , z ) ) = M ( M ( x , y ) , M ( x , z ) ) {\displaystyle M(x,M(y,z))=M(M(x,y),M(x,z))} .

Mediality: For any quasi-arithmetic mean M {\displaystyle M} of two variables: M ( M ( x , y ) , M ( z , w ) ) = M ( M ( x , z ) , M ( y , w ) ) {\displaystyle M(M(x,y),M(z,w))=M(M(x,z),M(y,w))} .

Balancing: For any quasi-arithmetic mean M {\displaystyle M} of two variables: M ( M ( x , M ( x , y ) ) , M ( y , M ( x , y ) ) ) = M ( x , y ) {\displaystyle M{\big (}M(x,M(x,y)),M(y,M(x,y)){\big )}=M(x,y)} .

Central limit theorem : Under regularity conditions, for a sufficiently large sample, n { M f ( X 1 , , X n ) f 1 ( E f ( X 1 , , X n ) ) } {\displaystyle {\sqrt {n}}\{M_{f}(X_{1},\dots ,X_{n})-f^{-1}(E_{f}(X_{1},\dots ,X_{n}))\}} is approximately normal. A similar result is available for Bajraktarević means and deviation means, which are generalizations of quasi-arithmetic means.

Scale-invariance: The quasi-arithmetic mean is invariant with respect to offsets and scaling of f {\displaystyle f} : a   b 0 ( ( t   g ( t ) = a + b f ( t ) ) x   M f ( x ) = M g ( x ) {\displaystyle \forall a\ \forall b\neq 0((\forall t\ g(t)=a+b\cdot f(t))\Rightarrow \forall x\ M_{f}(x)=M_{g}(x)} .

Characterization

There are several different sets of properties that characterize the quasi-arithmetic mean (i.e., each function that satisfies these properties is an f-mean for some function f).

  • Mediality is essentially sufficient to characterize quasi-arithmetic means.
  • Self-distributivity is essentially sufficient to characterize quasi-arithmetic means.
  • Replacement: Kolmogorov proved that the five properties of symmetry, fixed-point, monotonicity, continuity, and replacement fully characterize the quasi-arithmetic means.
  • Continuity is superfluous in the characterization of two variables quasi-arithmetic means. See for the details.
  • Balancing: An interesting problem is whether this condition (together with symmetry, fixed-point, monotonicity and continuity properties) implies that the mean is quasi-arithmetic. Georg Aumann showed in the 1930s that the answer is no in general, but that if one additionally assumes M {\displaystyle M} to be an analytic function then the answer is positive.

Homogeneity

Means are usually homogeneous, but for most functions f {\displaystyle f} , the f-mean is not. Indeed, the only homogeneous quasi-arithmetic means are the power means (including the geometric mean); see Hardy–Littlewood–Pólya, page 68.

The homogeneity property can be achieved by normalizing the input values by some (homogeneous) mean C {\displaystyle C} .

M f , C x = C x f 1 ( f ( x 1 C x ) + + f ( x n C x ) n ) {\displaystyle M_{f,C}x=Cx\cdot f^{-1}\left({\frac {f\left({\frac {x_{1}}{Cx}}\right)+\cdots +f\left({\frac {x_{n}}{Cx}}\right)}{n}}\right)}

However this modification may violate monotonicity and the partitioning property of the mean.

Generalizations

Consider a Legendre-type strictly convex function F {\displaystyle F} . Then the gradient map F {\displaystyle \nabla F} is globally invertible and the weighted multivariate quasi-arithmetic mean is defined by M F ( θ 1 , , θ n ; w ) = F 1 ( i = 1 n w i F ( θ i ) ) {\displaystyle M_{\nabla F}(\theta _{1},\ldots ,\theta _{n};w)={\nabla F}^{-1}\left(\sum _{i=1}^{n}w_{i}\nabla F(\theta _{i})\right)} , where w {\displaystyle w} is a normalized weight vector ( w i = 1 n {\displaystyle w_{i}={\frac {1}{n}}} by default for a balanced average). From the convex duality, we get a dual quasi-arithmetic mean M F {\displaystyle M_{\nabla F^{*}}} associated to the quasi-arithmetic mean M F {\displaystyle M_{\nabla F}} . For example, take F ( X ) = log det ( X ) {\displaystyle F(X)=-\log \det(X)} for X {\displaystyle X} a symmetric positive-definite matrix. The pair of matrix quasi-arithmetic means yields the matrix harmonic mean: M F ( θ 1 , θ 2 ) = 2 ( θ 1 1 + θ 2 1 ) 1 . {\displaystyle M_{\nabla F}(\theta _{1},\theta _{2})=2(\theta _{1}^{-1}+\theta _{2}^{-1})^{-1}.}

See also

References

  • Andrey Kolmogorov (1930) "On the Notion of Mean", in "Mathematics and Mechanics" (Kluwer 1991) — pp. 144–146.
  • Andrey Kolmogorov (1930) Sur la notion de la moyenne. Atti Accad. Naz. Lincei 12, pp. 388–391.
  • John Bibby (1974) "Axiomatisations of the average and a further generalisation of monotonic sequences," Glasgow Mathematical Journal, vol. 15, pp. 63–65.
  • Hardy, G. H.; Littlewood, J. E.; Pólya, G. (1952) Inequalities. 2nd ed. Cambridge Univ. Press, Cambridge, 1952.
  • B. De Finetti, "Sul concetto di media", vol. 3, p. 36996, 1931, istituto italiano degli attuari.
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MR4355191 - Characterization of quasi-arithmetic means without regularity condition

Burai, P.; Kiss, G.; Szokol, P. Acta Math. Hungar. 165 (2021), no. 2, 474–485.

MR4574540 - A dichotomy result for strictly increasing bisymmetric maps

Burai, Pál; Kiss, Gergely; Szokol, Patricia

J. Math. Anal. Appl. 526 (2023), no. 2, Paper No. 127269, 9 pp.

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